TY - JOUR
T1 - Relative K-homology of higher-order differential operators
AU - Fries, Magnus
PY - 2025
Y1 - 2025
N2 - We extend the notion of a spectral triple to that of a higher-order relative spectral triple, which accommodates several types of hypoelliptic differential operators on manifolds with boundary. The bounded transform of a higher-order relative spectral triple gives rise to a relative K-homology cycle. In the case of an elliptic differential operator on a compact smooth manifold with boundary, we calculate the K-homology boundary map of the constructed relative K-homology cycle to obtain a generalization of the Baum-Douglas-Taylor index theorem.
AB - We extend the notion of a spectral triple to that of a higher-order relative spectral triple, which accommodates several types of hypoelliptic differential operators on manifolds with boundary. The bounded transform of a higher-order relative spectral triple gives rise to a relative K-homology cycle. In the case of an elliptic differential operator on a compact smooth manifold with boundary, we calculate the K-homology boundary map of the constructed relative K-homology cycle to obtain a generalization of the Baum-Douglas-Taylor index theorem.
KW - Boundary value problems
KW - Differential operators
KW - K-homology
KW - Spectral triples
UR - https://www.scopus.com/pages/publications/85204186814
U2 - 10.1016/j.jfa.2024.110678
DO - 10.1016/j.jfa.2024.110678
M3 - Article
AN - SCOPUS:85204186814
SN - 0022-1236
VL - 288
JO - Journal of Functional Analysis
JF - Journal of Functional Analysis
IS - 1
M1 - 110678
ER -